Uniform blow-up rate for diffusion equations with nonlocal nonlinear source

ln this paper, we establish the local existence of the solution and the finite-time blowup result for the following system: where p, q > 1 and 0 < rl, r2 < 1. Moreover, it is proved that the solution has global blow-up and uniformly on compact subsets of f/, where 7 = Pq -(1 -rl)(1 -r2) and T\* is

In this paper, we investigate the blowup properties of the positive solutions to the following nonlocal degenerate parabolic equation with homogeneous Dirichlet boundary conditions in the interval (0, l), where 0 < α < 2, p 1 q 1 > m > 1. We first establish the local existence and uniqueness of its

This paper deals with interactions among three kinds of nonlinear mechanisms: nonlinear di usion, nonlinear reaction and nonlinear boundary ux in a parabolic model with multiple nonlinearities. The necessary and su cient blow-up conditions are established together with blow-up rate estimates for the